Litcius/Paper detail

Intrinsic nonlinear conductivity induced by quantum geometry in altermagnets and measurement of the in-plane Néel vector

Motohiko Ezawa

2024Physical review. B./Physical review. B13 citationsDOI

Abstract

The $z$-component of the N\'eel vector is measurable by the anomalous Hall conductivity in altermagnets because time reversal symmetry is broken. On the other hand, it is a nontrivial problem how to measure the in-plane component of the N\'eel vector. We study the second-order nonlinear conductivity of a system made of the $d$-wave altermagnet with the Rashba interaction. It is shown that the quantum-metric induced nonlinear conductivity and the nonlinear Drude conductivity are proportional to the in-plane component of the N\'eel vector, and hence, the in-plane component of the N\'eel vector is measurable. We obtain analytic formulas of the quantum-metric induced nonlinear conductivity and the nonlinear Drude conductivity both for the longitudinal and transverse conductivities. The quantum-metric induced nonlinear conductivity diverges at the Dirac point, while the nonlinear Drude conductivity is always finite. Hence, the quantum-metric induced nonlinear conductivity is dominant at the Dirac point irrespective of the relaxation time.

Topics & Concepts

ConductivityNonlinear systemPhysicsCondensed matter physicsQuantumMetric (unit)Drude modelPlane (geometry)Wave vectorTransverse planeQuantum mechanicsMathematicsGeometryEngineeringOperations managementEconomicsStructural engineeringTopological Materials and PhenomenaQuantum and electron transport phenomenaGraphene research and applications